Spectral Tur\'an problem of non-bipartite graphs: Forbidden books

Abstract

A book graph Br+1 is a set of r+1 triangles with a common edge, where r≥0 is an integer. Zhai and Lin [J. Graph Theory 102 (2023) 502-520] proved that for n≥132r, if G is a Br+1-free graph of order n, then (G)≤(Tn,2), with equality if and only if G Tn,2. Note that the extremal graph Tn,2 is bipartite. Motivated by the above elegant result, we investigate the spectral Tur\'an problem of non-bipartite Br+1-free graphs of order n. For general r≥1, let Kn-12,n-12r, r be the graph obtained from Kn-12,n-12 by adding a new vertex v0 such that v0 has exactly r neighbours in each part of Kn-12,n-12. By adopting a different technique named the residual index, Chv\'atal-Hanson theorem and typical spectral extremal methods, we in this paper prove that: If G is a non-bipartite Br+1-free graph of order n, then (G)≤(Kn-12,n-12r, r) , with equality if and only if G Kn-12,n-12r, r. An interesting phenomenon is that the spectral extremal graphs are completely different for r=0 and general r≥1.